On the Skitovich--Darmois theorem for the group of p-adic numbers

Abstract

Let p be the group of p-adic numbers, 1 and 2 be independent random variables with values in p and distributions μ1 and μ2. Let αj, βj be topological automorphisms of p. Assuming that the linear forms L1=α11 + α22 and L2=β11 + β22 are independent, we describe possible distributions μ1 and μ2 depending on the automorphisms αj, βj. This theorem is an analogue for the group p of the well-known Skitovich--Darmois theorem, where a Gaussian distribution on the real line is characterized by the independence of two linear forms.